Chaos and Indecomposability
Abstract
We use recent developments in local entropy theory to prove that chaos in dynamical systems implies the existence of complicated structure in the underlying space. Earlier Mouron proved that if is an arc-like continuum which admits a homeomorphism with positive topological entropy, then contains an indecomposable subcontinuum. Barge and Diamond proved that if is a finite graph and is any map with positive topological entropy, then the inverse limit space contains an indecomposable continuum. In this paper we show that if is a -like continuum for some finite graph and is any map with positive topological entropy, then contains an indecomposable continuum. As a corollary, we obtain that in the case that is a homeomorphism, contains an indecomposable continuum. Moreover, if has uniformly positive upper entropy, then is an indecomposable continuum. Our results answer some questions raised by Mouron and generalize the above mentioned work of Mouron and also that of Barge and Diamond. We also introduce a new concept called zigzag pair which attempts to capture the complexity of a dynamical systems from the continuum theoretic perspective and facilitates the proof of the main result.
Cite
@article{arxiv.1504.08341,
title = {Chaos and Indecomposability},
author = {Udayan B. Darji and Hisao Kato},
journal= {arXiv preprint arXiv:1504.08341},
year = {2015}
}